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Abstract

Zhiwei Yun and Wei Zhang introduced the notion of “super-positivity of self dual L-functions” which specifies that all derivatives of the completed L-function (including Gamma factors and power of the conductor) at the central value $s = 1/2$ should be non-negative. They proved that the Riemann hypothesis implies super-positivity for self dual cuspidal automorphic L-functions on $GL(n)$. Super-positivity of the Riemann zeta function was established by Pólya in 1927 and since then many other cases have been found by numerical computation. In this paper we prove, for the first time, that there are infinitely many L-functions associated to modular forms for $SL(2, {\bf Z})$ each of which has the super-positivity property. Our proof also establishes that all derivatives of the completed L-function at any real point $\sigma \gt 1/2$ must be positive.